a^x
In mathematics, the expression “a^x” represents the exponentiation of a base number “a” raised to the power of an exponent “x”
In mathematics, the expression “a^x” represents the exponentiation of a base number “a” raised to the power of an exponent “x”.
When “x” is a positive integer, the expression “a^x” denotes repeated multiplication of “a” by itself “x” times. For example, the expression “2^3” means multiplying 2 by itself three times: 2 * 2 * 2 = 8. Similarly, “5^4” represents multiplying 5 by itself four times: 5 * 5 * 5 * 5 = 625.
When “x” is 0, by convention, any non-zero base “a” raised to the power of 0 is equal to 1. So, for example, “3^0” equals 1, as does “10^0”.
When “x” is a negative integer, the expression “a^x” can be rewritten as 1 / “a” raised to the power of the absolute value of “x”. For instance, “2^(-2)” is equal to 1 / (2^2) = 1 / 4 = 0.25.
For non-integer values of “x”, the expression “a^x” involves the concept of exponentiation using logarithms and is typically addressed through calculus. In such cases, the value of “a” is assumed to be positive.
Overall, the expression “a^x” is a mathematical operation that showcases the concept of exponentiation, where a base number is raised to a certain power or exponent to determine the result.
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